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Trigonometric Ratios. A RATIO is a comparison of two numbers. For example; boys to girls cats : dogs right : wrong. In Trigonometry, the comparison is between sides of a triangle . We need to do some housekeeping before we can proceed….
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Trigonometric Ratios A RATIO is a comparison of two numbers. For example; boys to girls cats : dogs right : wrong. In Trigonometry, the comparison is between sides of a triangle.
In trigonometry, the ratio we are talking about is the comparison of the sides of a RIGHT TRIANGLE. Two things MUST BE understood: 1. This is the hypotenuse.. This will ALWAYS be the hypotenuse 2. This is 90°… this makes the right triangle a right triangle…. Without it, we can not do this trig… we WILL NOT use it in our calculations because we COULD NOT do calculations without it.
Now that we agree about the hypotenuse and right angle, there are only 4 things left; the 2 other angles and the 2 other sides. If we look at angle A, there is one side that is adjacent to it and the other side is opposite from it, and of course we have the hypotenuse. A We will refer to the sides in terms of their proximity to the angle hypotenuse adjacent opposite
If we look at angle B, there is one side that is adjacent to it and the other side is opposite from it, and of course we have the hypotenuse. hypotenuse opposite B adjacent
θ this is the symbol for an unknown angle measure. It’s name is ‘Theta’. Don’t let it scare you… it’s like ‘x’ except for angle measure… it’s a way for us to keep our variables understandable and organized. One more thing…
O S sinθ = opposite side hypotenuse H One more time… Here are the ratios: A C cosθ = adjacent side hypotenuse H O T tanθ =opposite side adjacent side A SOH CAH TOA
Make sure you have a calculator… Because we need to set it to “degrees” To set your calculator to ‘Degree’….. MODE (next to 2nd button) Degree (third line down… highlight it) 2nd Quit
Let’s practice writing ratios… Write the ratio for sin A Sin A = a c Write the ratio for cos A Cos A = b c Write the ratio for tan A Tan A = a b B c a C b A S=o h C=a h T=o a Let’s switch angles: Find the ratio of sin, cos and tan for Angle B: Tan B = b a Sin B = b c Cos B = a c
Let’s practice finding a side length… A Look at angle A… what sides do you have in relation to angle A? 10 cm x That’s right… You have an Adjacent side and a Hypotenuse 51° C B Look at SOH CAH TOA… Which function are you going to use? COSINE
Let’s practice… Find an angle that has a tangent (ratio) of 2 3 Round your answer to the nearest degree. C 2cm B 3cm A Process: I want to find an ANGLE I was given the sides (ratio) Tangent is opp adj TAN-1(2/3) = 34°
Ok… we’ve found side lengths, now let’s find angle measures. Refer to your table… what function will we use to find angle measures? • SIN-1 • COS-1 • TAN-1 These are called INVERSE FUNCTIONS
